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Kiran Kumar D L
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Preferred name
Kiran Kumar D L
Official Name
Kiran Kumar D L
Main Affiliation
RV College of Engineering
Email
Scopus Author ID
57204661746
5 results
Now showing 1 - 5 of 5
- PublicationINVARIANT SUBMANIFOLDS OF N(k)-CONTACT METRIC MANIFOLDS WITH GENERALIZED TANAKA WEBSTER CONNECTION(2022)
;Kumari D ;Nagaraja H.GThe object of the present paper is to study some geometric properties of invariant submanifolds of N(k)-contact metric manifold ad-mitting generalized Tanaka-Webster connection. � 2022. - PublicationRicci operator in a Hopf real Hypersurfaces of complex space form(2020)
;Manjulamma U ;Nagaraja H.GWe initiate the study of real hypersurface of a complex space form and it is proved that Lie parallelism of the Ricci operator in the direction of ?, locally symmetric Ricci operator in a real hypersurface of a complex space form reduce the hypersurface to Hopf hypersurface. � 2020 IOP Publishing Ltd. All rights reserved. - PublicationGeneralized complex space forms(2020)
;Manjulamma U ;Nagaraja H.GIn this paper, we find an eigen value of Ricci operator corresponding to scalar curvature r of a generalized complex space form and we give conditions for the existence of a generalized complex space form. Copyright � Deanship of Research and Graduate Studies, Yarmouk University, Irbid, Jordan. - PublicationSome curvature properties of kenmotsu manifolds with schouten-van kampen connection(2019)
; ;Nagaraja H.GNaveenkumar S.H.The aim of the present paper is to study the concircular curvature tensor, projective curvature tensor, Weyl conformal curvature tensor of Kenmotsu manifolds admitting Schouten-van Kampen connection and an example is given to verify our results. � 2019, Transilvania University of Brasov 1. All rights reserved. - PublicationRicci solitons and gradient Ricci solitons in a D-homothetically deformed K-contact manifold(2021)
;Venu K ;Nagaraja H.GThe object of this paper is to study Ricci solitons and gradient Ricci solitons in Da-homothetically deformed K-contact and N(k)-contact metric manifolds. � 2021 Balkan Society of Geometers, Geometry Balkan Press. All Rights Reserved.